Number theory in function fields/ Michael Rosen
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Item type | Current library | Call number | Status | Date due | Barcode | Item holds |
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Central Library, Sikkim University General Book Section | 512.7 ROS/N (Browse shelf(Opens below)) | Checked out | 05/06/2021 | P25344 |
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512.7 RAS/P Problem-solving and selected topics in number theory/ | 512.7 RIC/U Unsolved problems in number theory/ | 512.7 ROS/E Elementary number theory/ | 512.7 ROS/N Number theory in function fields/ | 512.7 TIG/G Galois Theory of Algebraic Equations | 512.72 BUR/E Elementary Number Theory/ | 512.72 BUR/E Elementary Number Theory/ |
1. Polynomials over finite fields --
2. Primes, Arithmetic functions, and the zeta function --
3. The reciprocity law --
4. Dirichlet L-series and primes in an arithmetic progression --
5. Algebraic function fields and global function fields --
6. Weil differentials and the canonical class --
7. Extensions of function fields, Riemann-Hurwitz, and the ABC theorem --
8. Constant field extensions --
9. Galois extensions : Hecke and Artin L-series --
10. Artin's primitive root conjecture --
11. The behavior of the class group in constant field extensions --
12. Cyclotomic function fields --
13. Drinfeld modules : an introduction --
14. S-units, S-class group, and the corresponding L-functions --
15. The Brumer-Stark conjecture --
16. The class number formulas in quadratic and cyclotomic function fields --
17. Average value theorems in function fields --
Appendix. A proof of the function field Riemann hypothesis.
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